let x0 be real number ; for f being PartFunc of REAL ,REAL st f is_differentiable_in x0 holds
( exp_R * f is_differentiable_in x0 & diff (exp_R * f),x0 = (exp_R . (f . x0)) * (diff f,x0) )
let f be PartFunc of REAL ,REAL ; ( f is_differentiable_in x0 implies ( exp_R * f is_differentiable_in x0 & diff (exp_R * f),x0 = (exp_R . (f . x0)) * (diff f,x0) ) )
assume A1:
f is_differentiable_in x0
; ( exp_R * f is_differentiable_in x0 & diff (exp_R * f),x0 = (exp_R . (f . x0)) * (diff f,x0) )
A2:
( x0 is Real & exp_R is_differentiable_in f . x0 )
by Th16, FDIFF_1:16, XREAL_0:def 1;
hence
exp_R * f is_differentiable_in x0
by A1, FDIFF_2:13; diff (exp_R * f),x0 = (exp_R . (f . x0)) * (diff f,x0)
thus diff (exp_R * f),x0 =
(diff exp_R ,(f . x0)) * (diff f,x0)
by A1, A2, FDIFF_2:13
.=
(exp_R . (f . x0)) * (diff f,x0)
by Th16
; verum